Calculus AB compatible with AP®

$125.00

Quantity

This product is currently sold out.

Please fill in the form below if you'd like to be notified when it becomes available.

Calculus AB compatible with AP®

This is the ultimate AP® Calculus AB study aid! Award-winning professor Edward Burger teaches the fundamentals of Calculus AB in dynamic video lessons. You'll learn the calculus concepts you need to score a perfect 5 on the AP® Calculus AB exam. And it's available whenever you need it for one flat price, so it's better than a tutor.

This is not a test preparation product in the sense of providing exam-taking tips; it's a full course geared to AP® caliber work. You can use it alongside your AP® classroom at school, reinforcing what you've learned so that you'll make the score you need on the AP® Calculus AB exam. It's filled with calculus tutorials that provide AP® Calculus instruction that fits your schedule. We explain limits, derivatives, integrals and more step by step, so that they're easy to remember when it's time for your AP® Calculus AB exam. Thinkwell's online Calculus AB subscription is a complete, web-based solution that includes all the content you'll need to succeed in AP® Calculus.

Printed Notes (optional, AB + BC) are the Calculus course notes from the Online Subscription printed in a black & white, on-the-go format. These are available for purchase from the AP® Calculus AB Course Site.

Printed Notes require the purchase of an online subscription.

(AP® is a registered trademark of the College Board, which was not involved in the production of this product. This course is designed for self-study preparation for the AP® exam and has not been audited by the College Board.)

Calculus AB compatible with AP® Materials

Online Subscription, 12-month access

Access to a complete online package that includes everything you need.

9.5.2 Trigonometric Substitution Involving a Definite Integral: Part One

9.5.3 Trigonometric Substitution Involving a Definite Integral: Part Two

9.6 Numerical Integration

9.6.1 Deriving the Trapezoidal Rule

9.6.2 An Example of the Trapezoidal Rule

10. Applications of Integration

10.1 Motion

10.1.1 Antiderivatives and Motion

10.1.2 Gravity and Vertical Motion

10.1.3 Solving Vertical Motion Problems

10.2 Finding the Area between Two Curves

10.2.1 The Area between Two Curves

10.2.2 Limits of Integration and Area

10.2.3 Common Mistakes to Avoid When Finding Areas

10.2.4 Regions Bound by Several Curves

10.3 Integrating with Respect to y

10.3.1 Finding Areas by Integrating with Respect to y: Part One

10.3.2 Finding Areas by Integrating with Respect to y: Part Two

10.3.3 Area, Integration by Substitution, and Trigonometry

10.4 The Average Value of a Function

10.4.1 Finding the Average Value of a Function

10.5 Finding Volumes Using Cross-Sections

10.5.1 Finding Volumes Using Cross-Sectional Slices

10.5.2 An Example of Finding Cross-Sectional Volumes

10.6 Disks and Washers

10.6.1 Solids of Revolution

10.6.2 The Disk Method along the y-Axis

10.6.3 A Transcendental Example of the Disk Method

10.6.4 The Washer Method across the x-Axis

10.6.5 The Washer Method across the y-Axis

10.7 Shells

10.7.1 Introducing the Shell Method

10.7.2 Why Shells Can Be Better Than Washers

10.7.3 The Shell Method: Integrating with Respect to y

10.8 Work

10.8.1 An Introduction to Work

10.8.2 Calculating Work

10.8.3 Hooke's Law

10.9 Moments and Centers of Mass

10.9.1 Center of Mass

10.9.2 The Center of Mass of a Thin Plate

10.10 Arc Lengths and Functions

10.10.1 An Introduction to Arc Length

10.10.2 Finding Arc Lengths of Curves Given by Functions

11. Differential Equations

11.1 Separable Differential Equations

11.1.1 An Introduction to Differential Equations

11.1.2 Solving Separable Differential Equations

11.1.3 Finding a Particular Solution

11.1.4 Direction Fields

11.1.5 Euler's Method for Solving Differential Equations Numerically

11.2 Growth and Decay Problems

11.2.1 Exponential Growth

11.2.2 Logistic Growth

11.2.3 Radioactive Decay

12. L'Hôpital's Rule and Improper Integrals

12.1 Indeterminate Quotients

12.1.1 Indeterminate Forms

12.1.2 An Introduction to L'Hôpital's Rule

12.1.3 Basic Uses of L'Hôpital's Rule

12.1.4 More Exotic Examples of Indeterminate Forms

12.2 Other Indeterminate Forms

12.2.1 L'Hôpital's Rule and Indeterminate Products

12.2.2 L'Hôpital's Rule and Indeterminate Differences

12.2.3 L'Hôpital's Rule and One to the Infinite Power

12.2.4 Another Example of One to the Infinite Power

12.3 Improper Integrals

12.3.1 The First Type of Improper Integral

12.3.2 The Second Type of Improper Integral

12.3.3 Infinite Limits of Integration, Convergence, and Divergence

13. Math Fun

13.1 Paradoxes

13.1.1 An Introduction to Paradoxes

13.1.2 Paradoxes and Air Safety

13.1.3 Newcomb's Paradox

13.1.4 Zeno's Paradox

13.2 Sequences

13.2.1 Fibonacci Numbers

13.2.2 The Golden Ratio

13.3 The Close of Calculus AB

13.3.1 A Glimpse Into Calculus II

About the Author

Edward Burger

Edward Burger is an award-winning professor with a passion for teaching mathematics.

Since 2013, Edward Burger has been President of Southwestern University, a top-ranked liberal arts college in Georgetown, Texas. Previously, he was Professor of Mathematics at Williams College. Dr. Burger earned his Ph.D. at the University of Texas at Austin, having graduated summa cum laude with distinction in mathematics from Connecticut College.

Prof. Burger's unique sense of humor and his teaching expertise combine to make him the ideal presenter of Thinkwell's entertaining and informative video lectures.